论文信息 - Representation of non-Gaussian probability distributions in stochastic load-flow studies by the method of Gaussian sum approximations

Representation of non-Gaussian probability distributions in stochastic load-flow studies by the method of Gaussian sum approximations

The stochastic load flow (SLF) is extended to include non-Gaussian `long-term' nodal probability-density-function (PDF) data by replacing each non-Gaussian PDF with a `Gaussian sum' approximation. A series of SLFs (stochastic load flows) are then performed and the results recombined, with the correct weightings, to generate non-Gaussian PDF profiles for busbars and lines of interest. Generally less than half of the most likely convolution components need evaluating. P - o, Q - V decomposition and nodal dependence is easily incorporated in the study and moment matching can be used to determine the `best' lower order Gaussian sum approximation. Long-term network topological impedance changes can also be included in the proposed method.

E.P.M. Brown | H. Sirisena | H. R. Sirisena | E. Brown

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